Answer to Question #161084 in Combinatorics | Number Theory for Geek

Assume from the sake of contradiction that there exist only finitely many primes.

Denote them as "P={p1,p2,\u22ef,pk}"

Let "A=15\u22c5p1\u22c5p2\u22efpk\u22121"

Then, we know that "A\u2261\u221211\u22614(mod15)."

Since for all "p\u2208P" such that "p\u2223A"

We know "A=k\u22c5pi," where "k\u2208Z\u2227pi\u2208P"

Hence, "A=pi\u22c5(15\u22c5p1\u22c5p2\u22efpi\u22121\u22c5pi+1\u22efpk)\u22121=k\u22c5pi"

This indicates that "pi\u22231"

However, by property of primes, "pi" should be greater than 1.

Hence, a contradiction.